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The Four-Parameters Wright Function of the Second kind and its Applications in FC

Yuri Luchko

2020Mathematics15 citationsDOIOpen Access PDF

Abstract

In this survey paper, we present both some basic properties of the four-parameters Wright function and its applications in Fractional Calculus. For applications in Fractional Calculus, the four-parameters Wright function of the second kind is especially important. In the paper, three case studies illustrating a wide spectrum of its applications are presented. The first case study deals with the scale-invariant solutions to a one-dimensional time-fractional diffusion-wave equation that can be represented in terms of the Wright function of the second kind and the four-parameters Wright function of the second kind. In the second case study, we consider a subordination formula for the solutions to a multi-dimensional space-time-fractional diffusion equation with different orders of the fractional derivatives. The kernel of the subordination integral is a special case of the four-parameters Wright function of the second kind. Finally, in the third case study, we shortly present an application of an operational calculus for a composed Erdélyi-Kober fractional operator for solving some initial-value problems for the fractional differential equations with the left- and right-hand sided Erdélyi-Kober fractional derivatives. In particular, we present an example with an explicit solution in terms of the four-parameters Wright function of the second kind.

Topics & Concepts

WrightFractional calculusMathematicsFunction (biology)Mathematical analysisApplied mathematicsCalculus (dental)Computer scienceMedicineBiologyProgramming languageDentistryEvolutionary biologyFractional Differential Equations SolutionsNonlinear Differential Equations AnalysisMathematical functions and polynomials